Some properties of entire functions with nonnegative Taylor coefficients (Q2473756)

The paper shows some properties of entire functions \(f(z)=\sum a_nz^n(a_n>0)\) with nonnegative coefficients. \(A_\rho\) denotes the class of transcendental entire functions with nonnegative Talor coefficients and of finite \(\rho\in[0,\infty)\). Provided \(f\in A_\rho\), then \[ \lim_{r\to\infty}\frac{f(r)f''(r)}{f'(r)}=1,\qquad \lim_{r\to\infty}\frac{\widetilde{f}(r+t\widetilde{f}(r))}{\widetilde{f}(r)}=1, \] and \[ f^{(n)}(r)\sim\frac{f(r)}{(\widetilde{f}(r))^n}\quad n\in\mathbb{N}, r\to\infty \] holds independently of the order \(\rho\), where \[ f(r)=\sum a_n| z| ^n,\qquad\widetilde{f}(r)=\frac{f(r)}{f'(r)}, \] and \(f^{(n)}(r)\) is the \(n\)th derivative of \(f(r)\).